Martingale Inequalities in Variable Exponent Hardy spaces with $0<p^-\leq p^+<\infty$

Published 21 Dec 2016 in math.PR | (1612.07160v1)

Abstract: We investigate the properties of the variable Lebesgue spaces with quasi-norm on a probability space, and give the atomic decompositions suited to the variable exponent martingale Hardy spaces. Using the decompositions and the harmonic mean of a variable exponent, we obtain several continuous embedding relations between martingale Hardy spaces with small exponent. Finally, we extend these results to the cases $0<p^-\leq p^+<\infty.$

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Martingale Inequalities in Variable Exponent Hardy spaces with $0<p^-\leq p^+<\infty$

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Martingale Inequalities in Variable Exponent Hardy spaces with $0<p^-\leq p^+<\infty$

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